Artículos de revistas
A short FE implementation for a 2d homogeneous Dirichlet problem of a fractional Laplacian
Fecha
2017-08Registro en:
Acosta Rodriguez, Gabriel; Mastroberti Bersetche, Francisco Vicente; Borthagaray Peradotto, Juan Pablo; A short FE implementation for a 2d homogeneous Dirichlet problem of a fractional Laplacian; Pergamon-Elsevier Science Ltd; Computers & Mathematics With Applications (1987); 74; 4; 8-2017; 784-816
0898-1221
CONICET Digital
CONICET
Autor
Acosta Rodriguez, Gabriel
Mastroberti Bersetche, Francisco Vicente
Borthagaray Peradotto, Juan Pablo
Resumen
In Acosta etal. (2017), a complete n-dimensional finite element analysis of the homogeneous Dirichlet problem associated to a fractional Laplacian was presented. Here we provide a comprehensive and simple 2D MATLAB ® finite element code for such a problem. The code is accompanied with a basic discussion of the theory relevant in the context. The main program is written in about 80 lines and can be easily modified to deal with other kernels as well as with time dependent problems. The present work fills a gap by providing an input for a large number of mathematicians and scientists interested in numerical approximations of solutions of a large variety of problems involving nonlocal phenomena in two-dimensional space.